Geodesic
The Smoothness of Convolutions of Singular Orbital Measures on Complex Grassmannians
Sanjiv Kumar Gupta1 ; Kathryn E. Hare2
1Dept. of Mathematics, Sultan Qaboos University, Sultanate of Oman
2Dept. of Pure Mathematics, University of Waterloo, Canada
Journal of Lie Theory, Tome 31 (2021) no. 2, pp. 335-349

Voir la notice de l'article provenant de la source Heldermann Verlag

It is well known that if $G/K$ is any irreducible symmetric space and $\mu_{a}$ is a continuous orbital measure supported on the double coset $KaK$, then the convolution product, $\mu _{a}^{k},$ is absolutely continuous for some suitably large number $k\leq \dim G/K$. The minimal value of $k$ is known in some symmetric spaces and in the special case of compact groups or rank one compact symmetric spaces it has even been shown that $\mu _{a}^{k}$ belongs to the smaller space $L^{2}$ for some $k$. Here we prove that this $L^{2}$ property holds for all the compact, complex Grassmannian symmetric spaces, $SU(p+q)/S(U(p)\times U(q))$. Moreover, for the orbital measures at a dense set of points $a$, we prove that $\mu _{a}^{2}\in L^{2}$ (or $\mu_{a}^{3}\in L^{2}$ if $p=q$).
Classification : 43A90, 43A85, 58C35, 33C50
Mots-clés : Orbital measure, spherical functions, complex Grassmannian symmetric space, absolute continuity

Sanjiv Kumar Gupta  1   ; Kathryn E. Hare  2

1 Dept. of Mathematics, Sultan Qaboos University, Sultanate of Oman
2 Dept. of Pure Mathematics, University of Waterloo, Canada 
Sanjiv Kumar Gupta; Kathryn E. Hare. The Smoothness of Convolutions of Singular Orbital Measures on Complex Grassmannians. Journal of Lie Theory, Tome 31 (2021) no. 2, pp. 335-349. http://geodesic.mathdoc.fr/item/JOLT_2021_31_2_a2/
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     title = {The {Smoothness} of {Convolutions} of {Singular} {Orbital} {Measures} on {Complex} {Grassmannians}},
     journal = {Journal of Lie Theory},
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